On the Definitions of Fractional Sum and Difference on Non-uniform Lattices

Abstract

As is well known, the idea of a fractional sum and difference on uniform lattice is more current, and gets a lot of development in this field. But the definitions of fractional sum and fractional difference of f(z) on non-uniform lattices x(z)=c1z2+c2z+c3 or x(z)=c1qz+c2q-z+c3 seem much more difficult and complicated. In this article, for the first time we propose the definitions of the fractional sum and fractional difference on non-uniform lattices by two different ways. The analogue of Euler's Beta formula, Cauchy' Beta formula on on non-uniform lattices are established, and some fundamental theorems of fractional calculas, the solution of the generalized Abel equation and fractional central difference equations on non-uniform lattices are obtained etc.